On the positive zeros of generalized Narayana polynomials related to the Boros-Moll polynomials

Abstract

The generalized Narayana polynomials Nn,m(x) arose from the study of infinite log-concavity of the Boros-Moll polynomials. The real-rootedness of Nn,m(x) had been proved by Chen, Yang and Zhang. They also showed that when n≥ m+2, each of the generalized Narayana polynomials has one and only one positive zero and m negative zeros, where the negative zeros of Nn,m(x) and Nn+1,m+1(x) have interlacing relations. In this paper, we study the properties of the positive zeros of Nn,m(x) for n≥ m+2. We first obtain a new recurrence relation for the generalized Narayana polynomials. Based on this recurrence relation, we prove upper and lower bounds for the positive zeros of Nn,m(x). Moreover, the monotonicity of the positive zeros of Nn,m(x) are also proved by using the new recurrence relation.